Answer:
Following are the solution to the given points:
Explanation:
In point 1:
The yield added by the regression equation increases 8.5 times of per each unit of fertilizer.
In point 2:
Definition i.e. [tex]R^2[/tex] describes the percentage of variation. Consequently, the value of Fertilizer variable describes 0.79 percent throughout the variance of the Bushels variable.
In point 3:
At [tex]60 \times 8.5 +8 = 518[/tex], Bushels has an fertilizer of 60.
In point 4:
The fertilizer should be 100 when bushels are:
[tex]\to 100= 8+ Fertilizer \times 8.5 \\\\ \to Fertilizer= 10.82 units[/tex]
In point 5:
Increased that amount of fertilizer will reduce the amount of bushels unless the value of determination was negative.
